Solution - Geometric Sequences

To find the general form of the series, plug the first term: $$a=245$$ and the common ratio: $$r=-0.14285714285714285$$ into the formula for geometric series:

$$a_1=245$$

$$a_2=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{2-1}=245\cdot -{0.14285714285714285}^1=245\cdot -0.14285714285714285=-35$$

$$a_3=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{3-1}=245\cdot -{0.14285714285714285}^2=245\cdot 0.02040816326530612=5$$

$$a_4=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{4-1}=245\cdot -{0.14285714285714285}^3=245\cdot -0.0029154518950437313=-0.7142857142857142$$

$$a_5=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{5-1}=245\cdot -{0.14285714285714285}^4=245\cdot 0.00041649312786339016=0.10204081632653059$$

$$a_6=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{6-1}=245\cdot -{0.14285714285714285}^5=245\cdot -5.949901826619859E-05=-0.014577259475218655$$

$$a_7=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{7-1}=245\cdot -{0.14285714285714285}^6=245\cdot 8.499859752314083E-06=0.0020824656393169504$$

$$a_8=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{8-1}=245\cdot -{0.14285714285714285}^7=245\cdot -1.214265678902012E-06=-0.0002974950913309929$$

$$a_9=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{9-1}=245\cdot -{0.14285714285714285}^8=245\cdot 1.7346652555743026E-07=4.2499298761570416E-05$$

$$a_{10}=a_1·r^{n-1}=245\cdot -{0.14285714285714285}^{10-1}=245\cdot -{0.14285714285714285}^9=245\cdot -2.4780932222490035E-08=-6.071328394510059E-06$$